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A generalization of the Gaussian formula and a q-analog of Fleck's congruence
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01 February 2012
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Abstract
The q-binomial coefficients are the polynomial cousins of the traditional binomial coefficients, and a number of identities for binomial coefficients can be translated into this polynomial setting. For instance, the familiar vanishing of the alternating sum across row n of Pascal's triangle is captured by the so-called Gaussian Formula. In this paper, we find a q-binomial congruence which synthesizes this result and Fleck's congruence for binomial coefficients.
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Most cited references10
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q-analogs of the binomial coefficient congruences of Babbage, Wolstenholme and Glaisher
George E. Andrews (1999)
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On the sum Σ k≡r(modm) ( k n ) and related congruencesand related congruences
Zhi-Wei Sun (2002)
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Combinatorial congruences modulo prime powers
Zhi-Wei Sun, Donald Davis (2007)